>>610

Σ_(k=0,[n/2])C(n-k,k){a(a+1)}^k ={a^(n+1)+(a+1)^(n+1)}/(2a+1),
Σ_(k=0,[n/2])C(n-k,k){a(a-1)}^k ={a^(n+1)-(1-a)^(n+1)}/(2a-1),

一般式は
Σ_(k=0,[n/2])C(n-k,k)b^k = 2F1(-(n-1)/2,-n/2;-n;-4b)

2F1(a,b;c;z)= Σ[k=0,∞]{(a)_k (b)_k /(c)_k}z^k /k !
         = 1 +(ab/c)z +{a(a+1)b(b+1)/c(c+1)}z^2 + …
(x)_0 = 1,
(x)_1 = x,
(x)_2 = x(x+1),
(x)_k = x(x+1)…(x+k-1),
Pochhammer の記号と云うらしい。